Chern Conjecture on Minimal Willmore Hypersurfaces with Constant Scalar Curvature

Abstract

In this paper, we prove that for an n-dimensional closed minimal Willmore hypersurface Mn with constant scalar curvature in the unit sphere Sn+1, the squared norm S of the second fundamental form of Mn satisfies S≥slant n+4n+9-4 n2+60 n+812 if S>n. This proves, in the approximate sense, the Chern conjecture about the second gap (S≥slant 2n if S>n), which will be fully verified under a further inequality condition about the 4-th mean curvature.

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